December 22, 2024, 08:47:32 PM
Forum Rules: Read This Before Posting


Topic: Time solution goes out  (Read 3184 times)

0 Members and 1 Guest are viewing this topic.

Offline DQD

  • Regular Member
  • ***
  • Posts: 29
  • Mole Snacks: +1/-0
Time solution goes out
« on: September 26, 2011, 07:44:35 AM »
The glass funnel, contains the solution with viscosity y (N.s/m2), radius r (mm), angle of bottom cone is 50o, hole's diameter is d (mm) and flow coefficient Cv

with differential equation: -fo.dH = Cv.f.wo.dt
Caculate time solution's out of glass funnel

fo: section of top the glass funnel
Cv : flow coefficient
f : section of hole
w : velocity through hole

I can't use integral from 2 sides equation to solve it, sb help me to get t(time) for caculating
and the viscosity, it dont be present at differential equation, why does it have in this problem ?

Sorry for my bad English and using speciality word

Offline SABRY

  • Regular Member
  • ***
  • Posts: 28
  • Mole Snacks: +1/-0
Re: Time solution goes out
« Reply #1 on: October 12, 2011, 04:47:47 AM »
Please review your differential equation. Take note following clues.

1. The velocity at the exit is given by following equation:
v = CvSQRT(2gh)
The volume flowrate
dQ/dt = v x a
where a is the x-sectional area at the bottom. Cv, g and h I beleieve you can figure out

2. The incremental volume flow rate at any point h is given by:
dQ/dt = Adh/dt

where A is the x-sectional of the funnel and it varies with h. The radius r at any point is related to h by the angle 50o.

3. Equation (1) and (2) should be equal.

4. Integrate to solve the equation



Offline SABRY

  • Regular Member
  • ***
  • Posts: 28
  • Mole Snacks: +1/-0
Re: Time solution goes out
« Reply #2 on: October 12, 2011, 04:51:19 AM »
Sorry... equation 2 should read

dQ/dt = - Adh/dt


Sponsored Links